Triply Existentially Complete Triangle-Free Graphs
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🧮 math.CO
keywords
triangle-freecompleteeverygraphsexistentiallygraphk-existentiallyvertex
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A triangle-free graph G is called k-existentially complete if for every induced k-vertex subgraph H of G, every extension of H to a (k+1)-vertex triangle-free graph can be realized by adding another vertex of G to H. Cherlin asked whether k-existentially complete triangle-free graphs exist for every k. Here we present known and new constructions of 3-existentially complete triangle-free graphs.
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